Answer:
[tex] \frac{168}{120} = \frac{21}{15} = \frac{7}{5} = 1.4[/tex]
So the percent increase is 40%.
The percentage increase from 120 to 168 is 40%. This is calculated by finding the increase (48), dividing it by the original number (120), and multiplying the result by 100.
Explanation:The question asks for the percentage increase from 120 to 168. To find this, we first determine the increase in the number, which is 168 - 120 = 48. The percentage increase is then calculated by dividing this increase by the original number (120 in this case), and then multiplying the result by 100 to get the percentage. So, the calculation would be (48/120) * 100 = 40. Therefore, the percentage increase from 120 to 168 is 40%.
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A snack-size bag of M&Ms candies contains 14 red candies, 14 blue, 9 green, 15 brown, 3 orange, and 8 yellow. If a candy is randomly picked from the bag, compute the following.
Answer: The probability of picking a red candy is 14/63, the probability of picking a blue candy is 14/63, the probability of picking a green candy is 9/63, the probability of picking a brown candy is 15/63, the probability of picking an orange candy is 3/63, and the probability of picking a yellow candy is 8/63. These probabilities can be calculated by dividing the number of candies of each color by the total number of candies in the bag.
Step-by-step explanation:
Answer: vvvvv
Step-by-step explanation:
The odds of getting a green M&M can be calculated by dividing the number of green M&M candies by the total number of candies in the bag.
Number of green M&Ms = 9
Total number of candies = 14 + 14 + 9 + 15 + 3 + 8 = 63
Odds of getting a green M&M = Number of green M&Ms / Total number of candies
Odds of getting a green M&M = 9/63 = 1/7
The probability of getting a green M&M can be calculated by dividing the number of green M&M candies by the total number of candies in the bag.
Probability of getting a green M&M = Number of green M&Ms / Total number of candies
Probability of getting a green M&M = 9/63 = 0.14285714285714285 or approximately 14.29% (rounded to two decimal places).
Also thanks a lot, now i want m&m's
Help please and thank you!
How many triangles are there?
Answer:
24
Step-by-step explanation:
starting with the "top floor" :
3 single small triangles.
then the left 2 combined and the right 2 combined.
and then all 3 combined.
that is 3 + 2 + 1 = 6 triangles.
now we extend the triangles from the top floor to the next floor below.
we have the same number of triangles, they are just longer.
6 triangles there.
and we extend the triangles to the next floor below.
we have again the same number of triangles, they are just even longer.
6 triangles there.
and we extend the triangles to the next (and last) floor below.
we have again the same number of triangles, they are just very long.
6 triangles there.
that makes for the 4 floors
6×4 = 24 triangles.
Which graph represents the function f(x) = x2 + 3x + 2?
The graph of the function is given above.
The graph of the function f(x) = x + 3x + 2 is a parabola that opens upwards.
We have,
The graph of the function f(x) = x + 3x + 2 is a parabola.
The coefficient of x² is positive, so the parabola opens upwards.
To sketch the graph of the function, we can use the vertex formula.
The x-coordinate of the vertex is given by -b/2a, where a and b are the coefficients of x^2 and x, respectively.
In this case, a = 1 and b = 3, so the x-coordinate of the vertex is -3/2.
To find the y-coordinate of the vertex, we can substitute this value of x into the function to get:
f(-3/2) = (-3/2)^2 + 3(-3/2) + 2 = 1/4 - 9/2 + 2 = -15/4
So the vertex is at (-3/2, -15/4).
We can also find the y-intercept by setting x = 0:
f(0) = 0² + 3(0) + 2 = 2
So the y-intercept is at (0, 2).
Thus,
The graph of the function is given below.
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3. Find the greatest common divisor of the sequence 16 +10n-1, n = 1,2,....
The greatest common divisor of the sequence 16 +10n-1, n = 1,2,... is 5.
To find the greatest common divisor of the sequence 16 +10n-1, n = 1,2,..., we can start by finding the values of the sequence for the first few terms:
When n = 1, the sequence is 16 + 10(1) - 1 = 25
When n = 2, the sequence is 16 + 10(2) - 1 = 35
When n = 3, the sequence is 16 + 10(3) - 1 = 45
We can see that all the terms in the sequence are odd numbers. This means that the greatest common divisor of the sequence must be an odd number.
To find the greatest common divisor, we can use the Euclidean algorithm. Let's start by finding the greatest common divisor of the first two terms:
gcd(25, 35) = gcd(25, 35 - 25) = gcd(25, 10) = gcd(5 x 5, 2 x 5) = 5
Now, let's find the greatest common divisor of the third term and the greatest common divisor of the first two terms:
gcd(45, 5) = gcd(5 x 9, 5) = 5
Therefore, the greatest common divisor of the sequence 16 +10n-1, n = 1,2,... is 5.
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2) y=-x+2
6-5-4
please help
A sealed-beam headlight is in the shape of a paraboloid of revolution. The bulb, which is placed at the focus, is 1 inch from the vertex. If the depth is to be 2 inches, what is the diameter of the headlight at its opening?
The diameter of the headlight's opening is 4 inches.
To find the diameter of the headlight's opening, we need to determine the distance between the two points on the paraboloid where the depth is 2 inches.
Using the formula for the paraboloid of revolution, we know that the equation for the shape of the headlight is:
[tex]y^2 = 4px[/tex]
where p is the distance from the vertex to the focus. In this case, p = 1 inch.
To find the distance between two points on the paraboloid where the depth is 2 inches, we can set y = ±2 and solve for x:
[tex]4p^2 = 4x(\pm2)\\x = p^2/\pm1[/tex]
Since we're interested in the distance between two points, we can subtract the two x-values:
[tex]x^2 - x^1 = p^{2/1} - p^{2/-1}\\x^2 - x^1 = 2p^2[/tex]
Substituting in the value of p, we get:
x2 - x1 = 2(1^2) = 2
So the distance between the two points where the depth is 2 inches is 2 inches.
To find the diameter of the headlight's opening, we need to double this distance and then multiply by the focal length:
d = 2(2)(1) = 4 inches
Therefore, the diameter of the headlight's opening is 4 inches.
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Which relationships have the same constant of proportionality between y and x as in the equation y=1/3x?
Therefore, any equation of the form y = kx, where k is a constant, has the same constant of proportionality as the equation y = (1/3)x.
Proportionality, equivalence between two ratios in mathematics. A and B are in the same ratio as C and D in the formula a/b = c/d. When one of a proportion's four quantities is unknown, a proportion is often built up to resolve the word problem.
According to the principle of proportionality, any incidental human casualties and property damage must not outweigh the tangible benefits to the military that may be expected from the destruction of a military objective.
The equation y = (1/3)x represents a proportional relationship between y and x with a constant of proportionality of 1/3.
Any equation of the form y = kx, where k is a constant, represents a proportional relationship between y and x with a constant of proportionality of k.
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Find a parametrization of the surface with equation (y2 + 1)e^z – (z^2 + 1)e^x + y^2z^2e^y = 0.
The surface with equation (y^2 + 1)e^z – (z^2 + 1)e^x + y^2z^2e^y = 0 can be parametrized as follows 1:
x = u
y = v
z = ln((v^2 + 1) / (u^2 + 1))
Parametrization of a surface is a mathematical technique used to describe a surface in terms of parameters. It involves expressing the coordinates of points on the surface as functions of two or more parameters. A common way to parametrize a surface is to use two parameters u and v to represent the coordinates of points on the surface. This is called a parametric representation or a parametric equation of the surface. Another way to parametrize a surface is to use a vector-valued function, which maps a point in a domain onto a point on the surface. Both of these techniques allow us to describe the surface in a way that is useful for mathematical analysis and visualization.
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Determine over what interval(s) (if any) the Mean Value Theorem applies. (Enter your answer using interval notation. If an answer does not exist, enter DNE.)
y=√x2−25
The Mean Value Theorem applies over the interval (-5, 5) and (5, ∞).
To determine the interval(s) where the Mean Value Theorem (MVT) applies for the function y=√(x^2-25), we need to ensure that the function is continuous and differentiable on the given interval.
1. The function is continuous when the expression under the square root is non-negative, which means x^2-25≥0. Solving for x, we get x≥5 or x≤-5. In interval notation, the domain for continuity is (-∞,-5] U [5,∞).
2. To check for differentiability, we need to find the derivative of the function. The derivative of y=√(x^2-25) is:
y' = (1/2)(x^2-25)^(-1/2) * 2x
y' = x/√(x^2-25)
Now, we need to ensure that the derivative is defined on the given interval. Since x=5 or x=-5 makes the denominator zero, we should exclude these points. Hence, the interval for differentiability is (-∞,-5) U (5,∞).
Since the MVT requires both continuity and differentiability, the applicable interval(s) for the Mean Value Theorem are (-∞,-5) U (5,∞).
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a physician orders to give 3 grams of an antibiotic intravenously to a patient over 1 hour. The vial of antibiotic comes in 4 grams and must be diluted with 20 mililiters of sterile water. How many mililiters of antibiotic must be drawn out of the vial for a 3 gram dose?
15 milliliters of antibiotic must be drawn out of the vial for a 3-gram dose.
To determine how many milliliters of the antibiotic must be drawn out of the vial for a 3-gram dose, follow these steps:
1. Identify the total amount of antibiotic in the vial (4 grams) and the volume after dilution (20 milliliters of sterile water).
2. Calculate the concentration of the antibiotic solution after dilution: 4 grams / 20 milliliters = 0.2 grams/mL.
3. Determine the required dose of the antibiotic (3 grams) and divide it by the concentration to find the volume needed: 3 grams / 0.2 grams/mL = 15 milliliters.
So, you will need to draw out 15 milliliters of the diluted antibiotic solution from the vial to administer the 3-gram dose intravenously to the patient over 1 hour.
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[tex]3a^{2} - 2a - 5[/tex]
make the factor of this^_^.
Answer:
3(a-0.3')^2 -5.3'
Step-by-step explanation:
you can factorized as i explaind you in the pic
Calculate simple interest on a loan for $1800 with a 6% interest rate that will be paid back after 2 years. What would the monthly payments be?
The required, monthly payment on the loan would be $84.00.
To calculate the simple interest on a loan, we use the formula:
Simple Interest = Principal * Interest Rate * Time
In this case, the Principal is $1800, the Interest Rate is 6% (or 0.06 as a decimal), and the Time is 2 years. So, the simple interest on the loan would be:
Simple Interest = $1800 * 0.06 * 2 = $216
To calculate the monthly payments, we need to add the interest to the principal and divide by the number of months in the loan term. Since the loan term is 2 years or 24 months, the monthly payment would be:
Monthly Payment = (Principal + Simple Interest) / Number of Months
= ($1800 + $216) / 24
= $84.00
Therefore, the monthly payment on the loan would be $84.00.
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Roya paid $48 for 12 cartons of orange juice. What is the unit rate per carton of orange juice that roya paid for
Step-by-step explanation:
You are given $ and cartons and you want $/carton
$ 48 / 12 cartons = $ 4 / carton <====unit rate
The table below gives the annual sales (in millions of dollars) of a product from
1998
1998 to
2006
2006. What was the average rate of change of annual sales in each time period?
Years
Years
Sales (millions of dollars)
Sales (millions of dollars)
1998
1998
201
201
1999
1999
219
219
2000
2000
233
233
2001
2001
241
241
2002
2002
255
255
2003
2003
249
249
2004
2004
231
231
2005
2005
243
243
2006
2006
233
233
a) Rate of change (in millions of dollars per year) between
2001
2001 and
2002
2002.
million/year
million/year
$
$
Preview
b) Rate of change (in millions of dollars per year) between
2001
2001 and
2004
2004.
Part(a),
The average rate of change in annual sales between 2001 and 2002 was $14$ million per year.
Part(b),
The average rate of change in annual sales between 2001 and 2004 was a decrease of $3.33$ million per year.
a) To find the rate of change between 2001 and 2002, we need to calculate the difference in sales between those two years and divide it by the number of years:
Rate of change = (Sales in 2002 - Sales in 2001) / (2002 - 2001)
Rate of change = (255 - 241) / 1 = 14 million/year
Therefore, the average rate of change of annual sales between 2001 and 2002 was $14$ million per year.
b) To find the rate of change between 2001 and 2004, we need to calculate the difference in sales between those two years and divide it by the number of years:
Rate of change = (Sales in 2004 - Sales in 2001) / (2004 - 2001)
Rate of change = (231 - 241) / 3 = -3.33 million/year
Therefore, the average rate of change of annual sales between 2001 and 2004 was a decrease of $3.33$ million per year.
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What is the distance between (3,-4) and (6,9)?
use the distance formula
A. 5.83
B. 7.47
C. 10.25
D. 13.34
Answer:
D. 13.34
Step-by-Step Explanation:
distance formula
[tex]d=\sqrt{(x2-x1)^2 +(y2-y1)^2} \\d=\sqrt{(6-3)^2 +(9-(-4))^2} \\d=\sqrt{178}[/tex]
Condition Number1. What is a condition number of a matrix and why and when it is important to compute?2. Calculate the condition number of two 3x3 Matrices? What can you conclude?3.Create a Hilbert Matrix and find its condition number. Use MATLAB to highlight the property of the inverse of the Hilbert matrix you choose to work with.
One property of the inverse of a Hilbert Matrix is that its entries grow very large as the size of the matrix increases. This can lead to numerical instability when computing the inverse, as the values become too large for the computer to handle.
The condition number of a matrix is a measure of its sensitivity to numerical errors during computation. It is defined as the ratio of the largest and smallest singular values of the matrix. A high condition number indicates that the matrix is ill-conditioned, meaning small perturbations in the input can result in large changes in the output. It is important to compute the condition number of a matrix when solving numerical problems, such as linear systems of equations or matrix inversions, to ensure the accuracy and stability of the solution.
Let's calculate the condition number of two 3x3 matrices:
Matrix A = [1 2 3; 4 5 6; 7 8 9]
Matrix B = [1 0 0; 0 1 0; 0 0 1]
Using MATLAB, we can compute the condition number of each matrix:
cond(A) = 2.96e+16
cond(B) = 1
We can conclude that Matrix A is ill-conditioned, while Matrix B is well-conditioned.
To create a Hilbert Matrix in MATLAB, we can use the hilb function. Let's create a 4x4 Hilbert Matrix and find its condition number:
H = hilb(4)
cond(H) = 15513.7387
We can see that the Hilbert Matrix is highly ill-conditioned.
One property of the inverse of a Hilbert Matrix is that its entries grow very large as the size of the matrix increases. This can lead to numerical instability when computing the inverse, as the values become too large for the computer to handle. In fact, for large n, the entries of the inverse approach infinity, making it effectively impossible to compute accurately.
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Toni purchased 3 points, each of which reduced her APR by 0. 125%. Each point cost 1% of her loan value. Her new APR is 3. 2%, and the points cost her $8,100. What is the original APR?
The annual interest savings is the amount Toni would save each year in interest charges due to the lower APR. It would be around 0.375%
Let x be the original APR. Then the first purchase of a point reduced the APR to x - 0.125%, the second point reduced it further to x - 0.25%, and the third point reduced it to x - 0.375%. Since Toni's new APR is 3.2%, we have:
x - 0.375% = 3.2%
Solving for x, we get:
x = 3.2% + 0.375% = 3.575%
Therefore, Toni's original APR was 3.575%.
To check our answer, we can use the fact that Toni purchased 3 points at a cost of 1% each. Since her loan value is the total cost of the points ($8,100) divided by the cost per percent (1%), we have:
loan value = $8,100 / 1% = $810,000
The reduction in APR due to the 3 points is 0.375%, which is equivalent to a reduction in the annual interest rate of:
0.375% / 100% = 0.00375
The annual interest savings due to the reduction in APR is then:
$810,000 x 0.00375 = $3,037.50
The annual interest savings is the amount Toni would save each year in interest charges due to the lower APR. Dividing this by the loan value gives us the actual reduction in APR:
$3,037.50 / $810,000 = 0.00375 = 0.375%
This confirms that our answer for the original APR is correct.
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You have a bale of hay that is 87% DM. If there is 638 lbs of DM in that bale, then what is the As Fed weight of the bale? Additionally, how many pounds of DM would be in 1 ton (2000 lbs) of that hay.
The As Fed weight of the bale is 733.33 lbs and in 1 ton (2000 lbs) of that hay there would be 1740 lbs of DM.
You have a bale of hay that is 87% DM, and there is 638 lbs of DM in that bale. To find the As Fed weight of the bale, you can use the following formula:
As Fed weight = (DM weight) / (% DM)
Step 1: Convert the percentage to a decimal:
87% DM = 0.87
Step 2: Plug the values into the formula:
As Fed weight = (638 lbs) / (0.87)
Step 3: Calculate the As Fed weight:
As Fed weight ≈ 733.33 lbs
So, the As Fed weight of the bale is approximately 733.33 lbs.
Now, to find how many pounds of DM would be in 1 ton (2000 lbs) of that hay, you can use the following formula:
DM in 1 ton = (2000 lbs) * (% DM)
Step 1: We already have the percentage as a decimal (0.87).
Step 2: Plug the values into the formula:
DM in 1 ton = (2000 lbs) * (0.87)
Step 3: Calculate the DM in 1 ton:
DM in 1 ton = 1740 lbs
Therefore, there would be 1740 lbs of DM in 1 ton (2000 lbs) of that hay.
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If two samples from the same population have the same mean and are both n=100, they will probably still have different a. t-statistics b. sample variances X c. standard errors d. alpha values A repe
If two samples from the same population have the same mean and are both n = 100, they will probably still have different sample variances.
We have,
If two samples from the same population have the same mean and are both n=100, they will probably still have different sample variances.
This is because sample variance refers to the dispersion or spread of data points within each individual sample, and this can vary even if the samples have the same mean and sample size (n=100).
It's important to note that the other options (t-statistics, standard errors, and alpha values) are related to the sampling distribution or hypothesis testing, which may not be different simply due to having the same mean and sample size.
Thus,
If two samples from the same population have the same mean and are both n = 100, they will probably still have different sample variances.
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7. Maryam purchased a blanket for her mom
from a local department store that was
having a sale. The blanket was offered at
20% off of its original listed price of $26.
How much did Maryam have off of the
original price?
Suppose a city contains 200,000 registered voters. Of these, 120,000 (60%) support a
particular ballot proposition to legalize recreational marijuana at the state level.
Suppose 200 of the voters are randomly selected to be polled, and all of them actually
respond to the poll and report their beliefs truthfully.
(a) The process of choosing 200 voters at random and counting the total number who
support the ballot proposition is like drawing 200 times without replacement from a
box. Describe or draw this box.
(b) If we drew 200 times with replacement from this box, there is a 95% chance that the
sum of draws (number of voters contacted who support the ballot proposition) would
be between ________ and _______. Expressed as a percentage of the 200 people, this is
between ________% and _______%.
(a) The box can be represented as a population of 200,000 registered voters, with 120,000 of them supporting the ballot proposition and 80,000 opposing it. Each voter can be represented by a ticket, and the box would contain 120,000 tickets labeled "Support" and 80,000 tickets labeled "Oppose."
(b) If we drew 200 times with replacement from this box, there is a 95% chance that the sum of draws (number of voters contacted who support the ballot proposition) would be between 106 and 134. Expressed as a percentage of the 200 people, this is between 53% and 67%.
(a) The box can be represented as a collection of 200,000 balls, where each ball corresponds to a registered voter. Among these, 120,000 balls are labeled as "support" to indicate that the voter supports the ballot proposition, and the remaining 80,000 balls are labeled as "oppose" to indicate that the voter does not support the proposition. When we randomly select 200 voters without replacement and count the number of supporters among them, we are essentially drawing 200 balls from this box without replacement and counting the number of balls labeled as "support".
(b) Since we are drawing with replacement, each draw is independent and has a Bernoulli distribution with a probability of success p = 0.6 (since 60% of the voters support the proposition). The sum of these draws has a binomial distribution with parameters n = 200 (the number of trials) and p = 0.6 (the probability of success). The mean of this distribution is μ = np = 200 x 0.6 = 120, and the standard deviation is σ = sqrt(np(1-p)) = sqrt(200 x 0.6 x 0.4) ≈ 7.75.
To find the range of values within which the sum of draws is likely to fall with 95% confidence, we can use the normal approximation to the binomial distribution, which is appropriate when np > 10 and n(1-p) > 10. In this case, we have np = 120 and n(1-p) = 80, so the normal approximation is valid.
We want to find the values of k such that P(μ - kσ < X < μ + kσ) = 0.95, where X is the sum of draws. Using the standard normal distribution, we have:
P(-k < Z < k) = 0.95,
where Z = (X - μ)/σ is a standard normal variable. From standard normal tables, we find that k ≈ 1.96.
Therefore, the 95% confidence interval for the sum of draws is:
120 - 1.96 x 7.75 ≈ 104.1 to 120 + 1.96 x 7.75 ≈ 135.9.
As a percentage of the 200 people polled, this is between:
104.1/200 x 100 ≈ 52.05% and 135.9/200 x 100 ≈ 67.95%.
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Negative three times a number plus seven is greater than negative 17.
Answer:
-3 times n+7>-17
Step-by-step explanation:
PLS:(
HC is a diameter. HA = 83°, BC= 50°, HD = 135°, GF = 32°, HG = 45°, and FE = 55°
Find the measures of the following angles.
The measures of the following angles are; Angle 1 =44
Given that HC is the diameter of the circle, then:
HA = 83°, BC= 50°, HD = 135°, GF = 32°, HG = 45°, and FE = 55°
From the given figure, HC can be expressed as:
HC = HA + BC + AB
Substituting with HC = 180°, HA = 83°, and BC = 50°, and solving for AB:
180 = 83 + AB + 50
AB = 47
The relation between the angle outside the circle, ∠1, and the intersected arcs AB and HD are:
Angle = 1/2(HD - AB)
Substituting with HD = 135°, and AB = 47°:
Angle 1 = 1/2(135 - 47)
Angle 1 =44
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A _________________ defect is considered very serious and will most likely cause operating failure.
a. Class A
b. Class B
c. Class C
d. Class D
Designed experiments are important tools for ______________________________.
a. Optimizing Processes
b. Identifying interactions among variables
c. Redusing variation in processes
d. All of the above
A Class A defect is considered very serious and will most likely cause operating failure.
Designed experiments are important tools for optimizing processes, identifying interactions among variables, and reducing variation in processes.
We have,
A Class A defect is typically the most severe type of defect in a manufacturing or quality control context.
It usually means that a product or component has a flaw that is likely to cause it to fail in normal use or operation, posing a significant risk to safety or functionality.
Designed experiments, also known as DOE (Design of Experiments), are a commonly used statistical tool in process optimization and improvement.
They involve careful planning and executing a series of controlled tests or trials to systematically investigate the effects of different process variables or factors on a given output or response variable.
Thus,
A Class A defect is considered very serious and will most likely cause operating failure. Designed experiments are important tools for optimizing processes, identifying interactions among variables, and reducing variation in processes.
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assign sum extra with the total extra credit received given list test grades. full credit is 100, so anything over 100 is extra credit.
To assign the sum of extra credit received to the total extra credit, you need to follow these steps:
1. Make a list of all the test grades, and mark the ones that have extra credit with a "+" sign. For example, if the test scores are: 95, 110+, 80, 120+, 100, you would mark the 110+ and the 120+.
2. Add up all the extra credit marks. In this example, that would be 110 + 120 = 230.
3. Count the number of extra credit marks. In this example, there are two.
4. Multiply the number of extra credit marks by the maximum extra credit value. If full credit is 100, then the maximum extra credit value is the amount that a student can exceed the maximum score by. In this case, that would be 20 (since 120 - 100 = 20). So, 2 x 20 = 40.
5. Add the extra credit value to the total score. In this example, the total score is 505 (95 + 110 + 80 + 120 + 100). So, you would add 40 to that to get 545.
Therefore, the answer is: To assign sum extra with the total extra credit received given list test grades, you need to add the extra credit value to the total score by multiplying the number of extra credit marks by the maximum extra credit value, and then adding that value to the total score.
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Recent crime reports indicate that 4.0 motor vehicle thefts occur each minute in USA. Assume the distribution of thefts per minute can be approximated by Poisson probability distribution. What is the probability that there is one or less theft in a minute?
The probability that there is one or less theft in a minute is 0.09161 or 9.161%.
To find the probability that there is one or less theft in a minute, given that recent crime reports indicate that 4.0 motor vehicle thefts occur each minute in the USA, we can use the Poisson probability distribution formula.
The Poisson probability formula is:
P(x) = (e^(-λ) * λ^x) / x!
where λ (lambda) represents the average rate of occurrences (4.0 thefts per minute in this case), x is the number of occurrences we're interested in (0 or 1 theft), and e is the base of the natural logarithm (approximately 2.71828).
We want to find the probability of having 0 or 1 theft, so we'll calculate the probabilities for x=0 and x=1, and then add them together.
For x = 0:
P(0) = (e^(-4) * 4^0) / 0! = (0.01832 * 1) / 1 = 0.01832
For x = 1:
P(1) = (e^(-4) * 4^1) / 1! = (0.01832 * 4) / 1 = 0.07329
Now, we add the probabilities together:
P(0 or 1 theft) = P(0) + P(1) = 0.01832 + 0.07329 = 0.09161
So, the probability that there is one or less theft in a minute, given the Poisson distribution, is approximately 0.09161 or 9.161%.
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Please help! See picture
The term that must be added to the equation to make it a perfect square is 9, which makes the option D correct.
How to evaluate for the term to make the equation a perfect squareWe have to apply completing the square method to know the term to be added as follows:
For the equation;
x² + 6x = 1
we first divide the coefficient of x by 2;
6/2 = 3
then we square the result;
3² = 9
and then add 9 to both sides of the equation to make it a perfect square
x² + 6x + 9 = 1 + 9
(x + 3)² = 10.
Therefore, the term that must be added to the equation to make it a perfect square is 9.
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Fill in the P(x - x) values to give a legitimate probability distribution for the discrete random vanuble X, whose possible values are 1, 2, 4, 5, and 6. Value of x P(X= ) 1 0.10 2 022 0.14 X 5 ?
The legitimate probability distribution for the discrete random variable X is:
Value of x P(X= )
1 0.10
2 0.22
4 0.14
5 0.18
6 0.36
To create a legitimate probability distribution, the sum of all the probabilities should be equal to 1. So, we can use the fact that the sum of all probabilities must equal 1 to find the missing probability for X = 5.
Value of x P(X= )
1 0.10
2 0.22
4 0.14
5 ?
6 0.36
To find P(X = 5), we can subtract the sum of the probabilities for X = 1, 2, 4, and 6 from 1:
P(X = 5) = 1 - (0.10 + 0.22 + 0.14 + 0.36) = 0.18
Therefore, the legitimate probability distribution for the discrete random variable X is:
Value of x P(X= )
1 0.10
2 0.22
4 0.14
5 0.18
6 0.36
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If rectangle STUV is translated using the rule (x, y) → (x − 2, y − 4) and then rotated 90° counterclockwise, what is the location of S″?
The location of S" after translating and rotating the rectangle is (-3, -4).
To find the location of S" after translating and rotating the rectangle, we need to follow the two steps in order:
Translation: Apply the rule (x, y) → (x − 2, y − 4) to each vertex of the rectangle to get its new location. The new vertices are:
S'(-4, -3), T'(-4, -1), U'(-2, -1), V'(-2, -3)
Rotation: Rotate the translated rectangle 90° counterclockwise. This means that each vertex will swap its x and y coordinates and the new x-coordinate will be negated. The new vertices after rotation are:
S"(-3, -4), T"(-1, -4), U"( -1, -2), V"(-3, -2)
Therefore, the location of S" is (-3, -4).
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